On the theorem of Borel for quasianalytic classes (Q2847670)

The authors investigate the surjectivity of the Borel map in the quasianalytic setting for classes of ultradifferentiable functions, or function germs, defined in terms of growth of the Fourier-Laplace transform. They deal with both the Roumieu \({\mathcal E}_{\{\omega\}}\) and the Beurling \({\mathcal E}_{(\omega)}\) classes associated with a weight function \(\omega\). They show, in particular, that the classical non-surjectivity result for non-analytic quasianalytic Denjoy-Carleman classes also holds for \({\mathcal E}_{\{\omega\}}\) classes. However, the proofs are completely different: they rely on functional analytic methods together with a theorem of Hörmander about the existence of entire functions with prescribed growth.